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# Student Solutions Manual to Accompany Applied Calculus

## Edition: 2nd 2003

### Authors: Deborah Hughes-Hallett, Andrew M. Gleason, Patti Frazer Lock, Daniel E. Flath, Sheldon P. Gordon

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### Description:

Work more effectively and check solutions as you go along with the text! This Student Solutions Manual provides complete solutions to every odd exercise in Hughes-Hallett's Applied Calculus, 2 nd Edition. These solutions will help you develop the strong foundation you need to succeed in your Calculus studies and give you the foundation that you need to apply the calculus you learned in the future. Achieving a fine balance between the concepts and procedures of calculus, Applied Calculus, 2 nd Edition provides readers with the solid background they need in the subject with a thorough understanding of its applications in a wide range of fields - from biology to economics.
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### Book details

List price: \$42.95
Edition: 2nd
Copyright year: 2003
Publisher: John Wiley & Sons, Incorporated
Publication date: 5/2/2002
Binding: Paperback
Pages: 144
Size: 8.50" wide x 10.50" long x 0.50" tall
Weight: 0.748
Language: English

 Functions and Change What is a Function? Linear Functions Rates of Change Applications of Functions to Economics Exponential Functions The Natural Logarithm Exponential Growth and Decay New Functions From Old Proportionality, Power Functions and Polynomials Periodic Functions Review of Chapter 1 Focus on Modeling Fitting Formulas to Data Compound Interest and the Number e Focus on Theory Limits to Infinity and end Behavior Rate of Change: The Derivative Instantaneous Rate of Change The Derivative Function Interpretations of the Derivative The Second Derivative Marginal Cost and Revenue Review of Chapter 2 Focus on Theory Limits, Continuity, and the Definition of the Derivative Short-Cuts to Differentiation Derivative Formulas for Powers and Polynomials Exponential and Logarithmic Functions The Chain Rule The Product and Quotient Rules Derivatives of Periodic Functions Review of Chapter 3 Focus on Theory Establishing Derivative Formulas Focus on Practice Differentiation Using the Derivative Local Maxima and Minima Inflection Points Global Maxima and Minima Profit, Cost, and Revenue Average Cost Elasticity of Demand Logistic Growth The Surge Function and Drug Concentration Review of Chapter 4 Accumulated Change: The Definite Integral Accumulated Change The Definite Integral The Definite Integral as Area Interpretations of the Definite Integral The Fundamental Theorem of Calculus Review of Chapter 5 Focus on Theory Theorems About Definite Integrals Using the Integral Average Value Consumer and Producer Surplus Present and Future Value Relative Growth Rates Review of Chapter 6 Antiderivatives Constructing Antiderivatives Analytically Integration by Substitution Using the Fundamental Theorem to Find Definite Integrals Analyzing Antiderivatives Graphically and Numerically Review of Chapter 7 Probability Density Functions Cumulative Distribution Functions and Probability The Median and the Mean Review of Chapter 8 Functions of Several Variables Understanding Functions of Two Variables Contour Diagrams Partial Derivatives Computing Partial Derivatives Algebraically Critical Points and Optimization Constrained Optimization Review of Chapter 9 Focus on Theory Deriving the Formula for a Regression Line Mathematical Modeling Using Differential Equations Math Modeling: Setting Up a Differential Equation Solutions of Differential Equations Slope Fields Exponential Growth and Decay Applications and Modeling Modeling the Interaction of Two Populations Modeling the Spread of a Disease Review of Chapter 10 Focus on Theory